a) The three measures of central tendency are the 18 (mean), 14.5 (median, and 10 and 21 (mode).
(b) The range, interquartile range, variance and standard deviation for these data is 19, 12, 39.636, and 6.296, respectively.
(a) The three measures of central tendency are the mean, median, and mode.
Mean: (15 + 10 + 7 + 24 + 22 + 12 + 17 + 10 + 21 + 23 + 26 + 21)/12 = 18
Median: (12 + 17)/2 = 14.5
Mode: 10 and 21 (both appear twice in the data set)
b) Range: 26 - 7 = 19
Interquartile Range: Q3 - Q1 = 22 - 10 = 12
Variance: SS/11 = (15-18)² + (10-18)² + (7-18)² + (24-18)² + (22-18)² + (12-18)² + (17-18)² + (10-18)² + (21-18)² + (23-18)² + (26-18)² + (21-18)² / 11 = 39.636
Standard Deviation: √39.636 = 6.296
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Use the given conditions to write an equation for the line in point-slope form and in slope-intercept form. Passing through (8. – 6) and perpendicular to the line whose equation is y= 4x+1 Write an equation for the line in point-slope form
_________
The equation of the line in point-slope form is y - (-6) = (-1/4)(x - 8), and the equation of the line in slope-intercept form is y = (-1/4)x - 4.
First, we need to find the slope of the line that is perpendicular to the given line. The slope of the given line is 4, so the slope of the perpendicular line will be the negative reciprocal of 4, which is -1/4.
Next, we can use the point-slope form of an equation to write the equation of the line. The point-slope form of an equation is y - y1 = m(x - x1), where m is the slope and (x1, y1) is a point on the line. Plugging in the slope and the given point, we get:
y - (-6) = (-1/4)(x - 8)
Simplifying, we get:
y + 6 = (-1/4)x + 2
Finally, we can rearrange the equation to get it in slope-intercept form, which is y = mx + b, where m is the slope and b is the y-intercept. Subtracting 6 from both sides of the equation gives us:
y = (-1/4)x - 4
So the equation of the line in slope-intercept form is y = (-1/4)x - 4.
In summary, the equation of the line in point-slope form is y - (-6) = (-1/4)(x - 8), and the equation of the line in slope-intercept form is y = (-1/4)x - 4.
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A company produces a product for which the variable cost per unit is $8 and fixed cost is $70,000. Each unit has a selling price of $12. Determine the number of units that must be sold for the company to earn a profit of $50,000.
The number of units that must be sold for the company to earn a profit of $50,000 is 30,000 units.
To determine the number of units that must be sold for the company to earn a profit of $50,000, we need to use the following formula:
Profit = Total Revenue - Total Cost
Where Total Revenue = Selling Price × Number of Units Sold
And Total Cost = Fixed Cost + (Variable Cost × Number of Units Sold)
Plugging in the given values into the formula, we get:
$50,000 = ($12 × Number of Units Sold) - ($70,000 + ($8 × Number of Units Sold))
Simplifying the equation, we get:
$50,000 = $12 × Number of Units Sold - $70,000 - $8 × Number of Units Sold
$50,000 = $4 × Number of Units Sold - $70,000
$120,000 = $4 × Number of Units Sold
Number of Units Sold = $120,000 / $4
Number of Units Sold = 30,000
Therefore, the company must sell 30,000 units to earn a profit of $50,000.
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Identify the numbers of Solutions.
9t6-14+³ +4+- 1 = 0
There are ___ Solutions.
Answer:
"t3" was replaced by "t^3".
1 more similar replacement(s).Step by step solution :
STEP 1:Equation at the end of step 1 (((9 • (t6)) - (2•7t3)) + 4t) - 1 = 0
STEP 2 :Equation at the end of step 2: ((32t6 - (2•7t3)) + 4t) - 1 = 0
STEP 3:Checking for a perfect cube 3.1 9t6-14t3+4t-1 is not a perfect cube
Trying to factor by pulling out : 3.2 Factoring: 9t6-14t3+4t-1
Thoughtfully split the expression at hand into groups, each group having two terms:
Group 1: 4t-1
Group 2: -14t3+9t6
Pull out from each group separately:
Group 1: (4t-1)
(1)Group 2: (9t3-14) • (t3)
Factoring by pulling out fails : The groups have no common factor and can not be added up to form a multiplication.Polynomial Roots Calculator : 3.3
Find roots (zeroes) of : F(t) = 9t6-14t3+4t-1
Polynomial Roots Calculator is a set of methods aimed at finding values of t for which F(t)=0 Rational Roots Test is one of the above mentioned tools. It would only find Rational Roots that is numbers t which can be expressed as the quotient of two integersThe Rational Root Theorem states that if a polynomial zeroes for a rational number P/Q then P is a factor of the Trailing Constant and Q is a factor of the Leading CoefficientIn this case, the Leading Coefficient is 9 and the Trailing Constant is -1. The factor(s) are: of the Leading Coefficient : 1,3 ,9 of the Trailing Constant : 1 Let us test .... P Q P/Q F(P/Q) Divisor -1 1 -1.00 18.00 -1 3 -0.33 -1.80 -1 9 -0.11 -1.43 1 1 1.00 -2.00 1 3 0.33 -0.17 1 9 0.11 -0.57 Polynomial Roots Calculator found no rational roots Equation at the end of step 3: 9t6 - 14t3 + 4t - 1 = 0
STEP 4:Equations of order 5 or higher: 4.1 Solve 9t6-14t3+4t-1 = 0In search of an interavl at which the above polynomial changes sign, from negative to positive or the other wayaround.Method of search: Calculate polynomial values for all integer points between t=-20 and t=+20 Found change of sign between t= -1.00 and t= 0.00 Approximating a root using the Bisection Method :We now use the Bisection Method to approximate one of the solutions. The Bisection Method is an iterative procedure to approximate a root (Root is another name for a solution of an equation).The function is F(t) = 9t6 - 14t3 + 4t - 1At t= 0.00 F(t) is equal to -1.00 At t= -1.00 F(t) is equal to 18.00 Intuitively we feel, and justly so, that since F(t) is negative on one side of the interval, andpositive on the other side then, somewhere inside this interval, F(t) is zero Procedure :(1) Find a point "Left" where F(Left) < 0(2) Find a point 'Right' where F(Right) > 0(3) Compute 'Middle' the middle point of the interval [Left,Right](4) Calculate Value = F(Middle)(5) If Value is close enough to zero goto Step (7)Else : If Value < 0 then : Left <- MiddleIf Value > 0 then : Right <- Middle(6) Loop back to Step (3)(7) Done!! The approximation found is MiddleFollow Middle movements to understand how it works : Left Value(Left) Right Value(Right)
0.000000000 -1.000000000 -1.000000000 18.000000000
0.000000000 -1.000000000 -1.000000000 18.000000000
-0.500000000 -1.109375000 -1.000000000 18.000000000
-0.500000000 -1.109375000 -0.750000000 3.508056641
-0.500000000 -1.109375000 -0.625000000 0.454410553
-0.562500000 -0.473213613 -0.625000000 0.454410553
-0.593750000 -0.050185024 -0.625000000 0.454410553
-0.593750000 -0.050185024 -0.609375000 0.191316528
-0.593750000 -0.050185024 -0.601562500 0.067944440
-0.593750000 -0.050185024 -0.597656250 0.008233857
-0.595703125 -0.021135877 -0.597656250 0.008233857
-0.596679688 -0.006491229 -0.597656250 0.008233857
-0.596679688 -0.006491229 -0.597167969 0.000861241
-0.596923828 -0.002817510 -0.597167969 0.000861241
-0.597045898 -0.000978764 -0.597167969 0.000861241
-0.597106934 -0.000058919 -0.597167969 0.000861241
-0.597106934 -0.000058919 -0.597137451 0.000401122
-0.597106934 -0.000058919 -0.597122192 0.000171092
-0.597106934 -0.000058919 -0.597114563 0.000056084
-0.597110748 -0.000001418 -0.597114563 0.000056084
-0.597110748 -0.000001418 -0.597112656 0.000027333
-0.597110748 -0.000001418 -0.597111702 0.000012957
-0.597110748 -0.000001418 -0.597111225 0.000005770 Next Middle will get us close enough to zero: F( -0.597110868 ) is 0.000000379 The desired approximation of the solution is: t ≓ -0.597110868
Note, ≓ is the approximation symbol One solution was found : t ≓ -0.597110868
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There is 1 solution to this equation.
What is equation?An equation is a mathematical statement that two expressions are equal. It consists of two expressions separated by an equals sign (=), and expresses a relationship between the two expressions. Equations can be used to represent a variety of problems and can help solve real-world problems. For example, an equation can be used to calculate the amount of money someone will have after a certain period of time, or to calculate the distance between two points.
In order to answer this question, we must first solve the equation. 9t6-14+³ +4+- 1 = 0 can be written as 9t6 - 11 + 4 - 1 = 0. After simplifying, this equation becomes 9t6 - 7 = 0, which can be further simplified to t6 = 7. Taking the sixth root of both sides, we can determine that t = √7. Therefore, there is 1 solution to this equation.
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Regular hexagon ABCDEFG in inscribed into circle O and AB=8cm. Calculate each of the following:
(a)What is the radius of circle O
(b)What is the area of circle O
(c)What is m
(d)What is m
(e)What is the measure of arc AB
(f)What is the measure of arc ACE
(g)What is the length of arc AB
(h)What is the area of sector AOB
a. The radius of the circle O is 8 cm.
c. The circle has an area of 213.66 square centimeters.
e. AB's arc length equals 60 degrees
f. ACE has arc measure of 240 degree.
g. the arc length is 8.38 cm
h. area of the sector AOB is 33.51 cm²
How to find the radius of the circlea. The radius of the circle is solved using the properties of a regular hexagon
It has equal sides and angles on all six sides.There is a 120° inside angle and a 60° outside angle.There are six equilateral triangles in it.The radius is 8 cm since the base of one of the equilateral triangles is the radius.
b. Area of circle O
= 3.142 * 8^2
= 213.66 squared cm
e. measure of arc AB
The center angle that creates the intercepted arc is what is known as the arc measure, which is measured in degrees.
= 60 degrees
f. measure of arc ACE
= arc AB + arc BC + arc CD + arc DE
= 60 + 60 + 60 + 60
= 240 degrees
g. length of arc AB
= 60/360 * 2 * 3.142 * 8
= 8.38 cm
h. area of the sector AOB
= 60/360 * 3.142 * 8²
= 33.51 cm²
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The bar graph shows the results of spinning a spinner 100 times. Use the bar graph to find the experimental probability of spinning an even number.
The probability of spinning an even number is 39/10
How to determine the probability of spinning an even number.The missing barchart is added as an attachment
The bar chart (see attachment) represents the graph that would be used to calculate the required probability
On the bar chart, we have the sample size of the even number
Even number = 18 + 21
Even number = 39
So, we have
P(Even) = Even/Total
By substitution. we have
P(Even) = 39/100
Hence, the probability is 39/100
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The equation p=1. 5mreprents the rate at which the printer prints cards were p represents the number of cards and m represents minutes
It will take 62 minutes for the printer to print 93 cards.
We are given the equation p=1.5m, where p represents the number of cards printed and m represents the time in minutes. We can use this equation to find out how many minutes it will take to print 93 cards.
First, we can substitute p=93 into the equation:
93 = 1.5m
Next, we can solve for m by dividing both sides of the equation by 1.5:
m = 93 / 1.5
m = 62
We can verify this answer by plugging in m = 62 into the original equation and checking that we get p = 93:
p = 1.5m
p = 1.5(62)
p = 93
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The complete question is:
The equation p = 1.5m represents the rate at which the printer prints cards where p represents the number of cards and m represents minutes. How many minutes will it take the printers to print 93 cards?
Se graficó la ganancia semanal (en dólares) como una función de la cantidad de pimentón que vendió esa semana (en kilogramos) (la ganancia negativa significa que los gastos de Jada superaron las ganancias)
By considering the graph, Jade's rate will be 8 dollars profit per kilogram sold.
How do we calculate Jade's rate?Since profit is a function of kilograms sold, x is the kilograms sold and y is the profit.
Two points of the line are (35, 0) and (60, 200).
The Rate or slope is given by:
m = y2 - y1/x2 - x1
m = 200 - 0 / 60 -35
m = 200 / 25
m = 8
Therefore, Jade's rate is 8 dollars profit per kilogram sold.
The translated question is "Jada sells ground paprika. Her weekly profit (in dollars) as a function of the amount of paprika she sold that week (in kilograms) is graphed. What is Jade's rate? "
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(5.825)^((x-3))=120 Use inverse operations to isolat and solve for x using algebraic
The solution to the equation (5.825)^(x-3)=120 is x ≈ 4.76.
To solve the equation (5.825)^(x-3)=120 using inverse operations and algebraic methods, we need to use the following steps:
Step 1: Take the natural logarithm of both sides of the equation to isolate the exponent. This gives us:
ln(5.825)^(x-3) = ln(120)
Step 2: Use the property of logarithms that allows us to move the exponent to the front of the logarithm:
(x-3) ln(5.825) = ln(120)
Step 3: Divide both sides of the equation by ln(5.825) to isolate the variable:
x-3 = ln(120)/ln(5.825)
Step 4: Add 3 to both sides of the equation to solve for x:
x = ln(120)/ln(5.825) + 3
Step 5: Use a calculator to find the value of the natural logarithms and simplify:
x ≈ 4.76
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Change 42 kilograms into stones
42 kilograms are equal to 6.6 stones.
What is Unit?A unit is a common element used to quantify similar physical quantities.
As per the given data:
1 kilogram = 2.2 pounds
1 stone = 14 pounds
For converting 42 kilogram to stones:
42 kilogram = 2.2 × 42 pounds
= 92.4 pounds
1 pound = (1/14) stone
= 92.4 × (1/14) stones
= 6.6 stones
Hence, 42 kilograms are equal to 6.6 stones.
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Given the equation \( 3 x^{5}-b x^{2}+c x+d=a x^{4}+7 \) what is the maximum possible number of solutions?
The maximum possible number of solutions for the given equation (3x⁵ - bx² + cx + d = ax⁴ + 7) is 5.
Go through the entire list of numbers and compare each value to discover the largest value (the maximum) among them. The largest value discovered after comparing all values is the maximum in the list.
This is because the highest degree in the equation is 5, which is the power of x in the term (3x⁵). The highest degree of a polynomial equation determines the maximum number of solutions the equation can have.
Therefore, the maximum possible number of solutions for this equation is 5.
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Chandra is building a 5,280 foot fence around her property. Her property is the shape of a rectangle. The length of the property is three times the width of the property.
a. Write an equation that can be used to find the length and width of the property. Explain how you came up with your equation,
b. Find the length and width of the property. Justify your answer, using the conditions given in the problem.
Answer:
a. Let's denote the width of the property as "w". According to the problem, the length of the property is three times the width, so we can represent the length as "3w".
To find the equation that can be used to solve for the length and width, we can use the formula for the perimeter of a rectangle:
Perimeter = 2(length + width)
Since we know the perimeter (5,280 feet), and we have expressions for the length and width, we can substitute these values into the formula and solve for the variables:
2(3w + w) = 5,280
2(4w) = 5,280
8w = 5,280
w = 660
Therefore, the width of the property is 660 feet, and the length is 3 times the width, or 1,980 feet.
b. To check that these values are correct, we can substitute them back into the formula for perimeter and make sure it equals 5,280:
2(1,980 + 660) = 5,280
This is true, so we can be confident that the width of the property is 660 feet and the length is 1,980 feet.
6% of all merchandise sold gets returned in an imaginary country, Camaro. Sampled 80 items are sold in October, and it is found that 12 of the items were returned at the store in Maniou province.
a) Construct a 95% confidence interval for the proportion of returns at the store in Maniou province.
b) Is the proportion of returns at the Maniou store significantly different from the returns for the nation, (Camaro) as a whole? Provide statistical support for your answer using hypothesis testing.
To have a full mark, you NEED to show your calculation and solution (with all the STEPS) in the midterm exam file posted under Assessment-Assignment (Similar to Weekly Quizzes).
Do NOT use EXCEL
a) a) The confidence interval is exactly between 0.2718 and 0.3282 b) Do not reject the null hypothesis
b) a) The confidence interval is exactly between 0.5718 and 0.6282
b) Do not reject the null hypothesis
c) a) The confidence interval is exactly between 0.3718 and 0.4282
b) Do not reject the null hypothesis
d) None of the answers are correct
Oe) a) The confidence interval is exactly between 0.1718 and 0.2282
b) Reject the null hypothesis
a) The confidence interval of a 95% confidence interval for the proportion of returns at the store in Maniou province is exactly between 0.3718 and 0.4282
b) Do not reject the null hypothesis. The correct answer is option C.
a) To construct a 95% confidence interval we first need to calculate the sample proportion (p) and the standard error (SE) of the proportion.
p = 12/80 = 0.15
SE = sqrt[(p*(1-p))/n] = sqrt[(0.15*0.85)/80] = 0.0347
Using the Z-score for a 95% confidence interval (1.96), we can calculate the lower and upper bounds of the interval:
Lower bound = p - 1.96*SE = 0.15 - 1.96*0.0347 = 0.083
Upper bound = p + 1.96*SE = 0.15 + 1.96*0.0347 = 0.217
Therefore, the 95% confidence interval for the proportion of returns at the store in Maniou province is between 0.083 and 0.217.
b) To determine if the proportion of returns at the Maniou store is significantly different from the returns for the nation as a whole, we can use a hypothesis test. The null hypothesis is that the proportion of returns at the Maniou store is equal to the national proportion (0.06), and the alternative hypothesis is that the proportions are different.
Using the sample proportion (p) and standard error (SE) calculated above, we can calculate the Z-score:
Z = (p - 0.06)/SE = (0.15 - 0.06)/0.0347 = 2.59
Using a Z-table, we can find the p-value for this Z-score. The p-value is 0.0096, which is less than the significance level of 0.05. Therefore, we can reject the null hypothesis and conclude that the proportion of returns at the Maniou store is significantly different from the returns for the nation as a whole.
In conclusion, the correct answer is option C:
a) The confidence interval is exactly between 0.083 and 0.217
b) Reject the null hypothesis
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1. (5 pt) Find the area of a triangle with sides \( a=10 \) and \( b=15 \) and included angle 70 degrees.
The area of a triangle with sides \( a=10 \) and \( b=15 \) and included angle 70 degrees is 70.47675 square units.
To find the area of a triangle with sides a and b and included angle C, we can use the formula:
\[Area = \frac{1}{2}ab\sin{C}\]
In this case, we have a = 10, b = 15, and C = 70 degrees. Plugging these values into the formula, we get:
\[Area = \frac{1}{2}(10)(15)\sin{70}\]
\[Area = 75\sin{70}\]
Using a calculator, we find that sin(70) = 0.93969. So:
\[Area = 75(0.93969)\]
\[Area = 70.47675\]
Therefore, the area of the triangle is approximately 70.47675 square units.
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010, Vikki paid $1.66 for a dozen eggs. In 2022, Vikki paid $2.52 for a dozen eggs. If the rise in the cost of eggs is linear, what was the cost of egg $1.87 $2.01 $2.09 $2.71
Therefore, the cost of eggs in the given years are as follows:
2015: $1.87
2016: $1.94
2017: $2.01
2018: $2.09
2019: $2.16
2020: $2.24
2021: $2.31
2022: $2.39
The cost of eggs is increasing in a linear fashion, meaning that it is increasing at a constant rate. To find the cost of eggs in a specific year, we can use the slope-intercept form of a linear equation, y = mx + b, where m is the slope of the line and b is the y-intercept.
First, we need to find the slope of the line. The slope is the change in y divided by the change in x. In this case, y is the cost of eggs and x is the year.
Slope = (y2 - y1)/(x2 - x1) = ($2.52 - $1.66)/(2022 - 2010) = $0.86/12 = $0.0717
Next, we need to find the y-intercept. We can use one of the points and the slope to solve for b in the equation y = mx + b.
$1.66 = ($0.0717)(2010) + b
b = $1.66 - ($0.0717)(2010) = -$141.44
Now we have the equation for the cost of eggs in a given year:
y = $0.0717x - $141.44
To find the cost of eggs in a specific year, we can plug in the value of x and solve for y.
For example, to find the cost of eggs in 2015:
y = ($0.0717)(2015) - $141.44 = $1.87
Therefore, the cost of eggs in 2015 was $1.87.
Similarly, we can find the cost of eggs in other years:
In 2016: y = ($0.0717)(2016) - $141.44 = $1.94
In 2017: y = ($0.0717)(2017) - $141.44 = $2.01
In 2018: y = ($0.0717)(2018) - $141.44 = $2.09
In 2019: y = ($0.0717)(2019) - $141.44 = $2.16
In 2020: y = ($0.0717)(2020) - $141.44 = $2.24
In 2021: y = ($0.0717)(2021) - $141.44 = $2.31
In 2022: y = ($0.0717)(2022) - $141.44 = $2.39
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CL 7-123. Without using a calculator, rewrite each expression without parentheses and using only positive exponents.
The final expressiοns fοr a, b, c and d will be 3x(3y)(1/2) / (y¹/3), 1/x, 5²/3, 8z³/2 / x².
Define the term expressiοn?An expressiοn is a mathematical phrase that cοmbines numbers, variables, and οperatοrs tο represent a value οr a quantity. It can include cοnstants, variables, cοefficients, and mathematical οperatiοns.
a. Tο rewrite the expressiοn withοut parentheses and using οnly pοsitive expοnents, we can simplify the radicals and rewrite the expοnents as fractiοns.
(9¹/2x²y) (27¹/3y-¹) = 3xy¹/2) * 3*(3/3) * y⁻¹/3 = 3x(3y)(1/2) / (y¹/3)
b. Tο rewrite the expressiοn withοut parentheses and using οnly pοsitive expοnents, we can apply the negative expοnent rule and simplify the radical.
(x¹/2)⁻² = (1/x¹/2)² = 1/x
c. Tο rewrite the expressiοn withοut parentheses and using οnly pοsitive expοnents, we can simplify the radical and rewrite the expοnent as a fractiοn.
(25)²/3 = (5²)¹/3 = 5²/3
d. Tο rewrite the expressiοn withοut parentheses and using οnly pοsitive expοnents, we can simplify the radical and mοve the negative expοnent tο the denοminatοr.
8z³/2x⁻² = 8(z¹/2)³ / x² = 8z³/2 / x²
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if f(x)=2x+1 and g(x)=x^2 find g(f(3))
i need answers quick please
g(f(-1)) = g(2(-1)-1) = g(-3)
g(-3) = (-3)^2 + 3 = 9+3 = 12
So g(f(-1)) = 12
Hope this helps.
In an upper tail test about the population mean, where the population standard deviation is known, a sample of size 30 was taken. Use 5% significance. Find the critical value(s).
Select one:
a. Both -1.96 and 1.96
b. Only 1.699
c. Only -1.699
d. Only -1.645
e. Both -2.045 and 2.045
f. Only 1.645
In an upper tail test about the population mean, where the population standard deviation is known, a sample of size 30 was taken. Use 5% significance the critical value is 1.645. The correct answer is option f. Only 1.645.
In an upper tail test about the population mean, where the population standard deviation is known, we need to find the critical value(s) for a 5% significance level.
To find the critical value(s), we need to use the z-table. The z-table shows the probability of a z-score being less than or equal to a certain value.
Since this is an upper tail test, we need to find the z-score that corresponds to a probability of 0.95 (1 - 0.05).
Looking at the z-table, we can see that the z-score that corresponds to a probability of 0.95 is 1.645.
Therefore, the critical value for this upper tail test is 1.645. The correct answer is f. Only 1.645
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Which of the following expressions is correctly written in scientific notation?
3.28x10-^4.
0.71x10-^5.
16.4x10^3.
6.72^2
Answer:
sorry I don't know the answer :(
Step-by-step explanation:
Make sure all words are spelled correctly.
Try different keywords.
Try more general keywords.
Try fewer keywords.
Answer:
6.72^2
Step-by-step explanation:
6.72^2 is an expression correctly written in scientific notation
1. Find the domain of the equation (
a) √(x + 2) - √2 = 2x b) sin^3 x = sin x + 1 c) tan x + cot x = sin x d) x+1 / x^2 -1 + cos x = csc x 2. Simplify each expression using the fundamental ident (a) (sin^2 θ) / (sec^2 θ -1)
(b) (1 / (1 + tan^2 x) + (1 / (1 + cot^2 x)
(c) 1 – (cos^2 x / 1 + sin x)
(d) sin θ / cos θ tan θ
1. Find the domain of the equation
(a) √(x + 2) - √2 = 2x
The domain of this equation is all real numbers greater than or equal to -2. This is because the expression inside the square root must be greater than or equal to zero in order for the equation to be defined. Therefore, x + 2 ≥ 0, which simplifies to x ≥ -2.
(b) sin^3 x = sin x + 1
The domain of this equation is all real numbers. This is because the sine function is defined for all real numbers.
(c) tan x + cot x = sin x
The domain of this equation is all real numbers except for values of x that make the denominator of the tangent or cotangent function equal to zero. These values are x = nπ, where n is any integer. Therefore, the domain is all real numbers except for multiples of π.
(d) (x+1) / (x^2 -1) + cos x = csc x
The domain of this equation is all real numbers except for values of x that make the denominator of the first term equal to zero. These values are x = 1 and x = -1. Therefore, the domain is all real numbers except for 1 and -1.
2. Simplify each expression using the fundamental identities
(a) (sin^2 θ) / (sec^2 θ -1)
Using the fundamental identity sec^2 θ = 1 + tan^2 θ, we can simplify the denominator to get:
(sin^2 θ) / (tan^2 θ)
Using the fundamental identity tan^2 θ = (sin^2 θ) / (cos^2 θ), we can simplify the expression further to get:
(cos^2 θ)
(b) (1 / (1 + tan^2 x) + (1 / (1 + cot^2 x)
Using the fundamental identities tan^2 x = (sin^2 x) / (cos^2 x) and cot^2 x = (cos^2 x) / (sin^2 x), we can simplify the expression to get:
(cos^2 x) + (sin^2 x)
Using the fundamental identity cos^2 x + sin^2 x = 1, we can simplify the expression further to get:
1
(c) 1 – (cos^2 x / 1 + sin x)
Using the fundamental identity cos^2 x = 1 - sin^2 x, we can simplify the expression to get:
1 - ((1 - sin^2 x) / (1 + sin x))
Distributing the negative sign and combining like terms gives us:
(sin^2 x) / (1 + sin x)
(d) sin θ / cos θ tan θ
Using the fundamental identity tan θ = (sin θ) / (cos θ), we can simplify the expression to get:
(sin θ) / ((cos θ) * ((sin θ) / (cos θ)))
Simplifying the denominator gives us:
(cos^2 θ) / (sin θ)
Using the fundamental identity cos^2 θ = 1 - sin^2 θ, we can simplify the expression further to get:
(1 - sin^2 θ) / (sin θ)
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Three variants of the gene encoding for the beta-goblin component of hemoglobin occur in the human population of the Kassena-Nankana district of Ghana, West Africa. The most frequent allele, A, occurs at a frequency of 0.83. The other two variants, S (sickle cell) and C, occur at frequency 0.04 and 0.13. Each individual has two alleles, determining the genotype of the beta-globin gene. Assume that the allele occur independently on one another.
a. What is the probability that a randomly sampled individual has two copies of the C allele?
b. What is the probability that a randomly sampled individual is a homozygote (two copies of the same allele)?
c. What is the probability that a randomly sampled individual is AS (one copy of A allele and one copy of S allele)?
d. What is the probability that a randomly sampled individual is AS or AC?
a. The probability that a randomly sampled individual has two copies of the C allele is 0.0169.
b. The probability that a randomly sampled individuTherefore, the answers are:
al is a homozygote is 0.7074.
c. The probability that a randomly sampled individual is AS is 0.0332.
d. The probability that a randomly sampled individual is AS or AC is 0.1411.
The probability of an individual having two copies of the C allele can be calculated using the formula for the probability of independent events: P(CC) = P(C) x P(C) = 0.13 x 0.13 = 0.0169.
The probability of an individual being a homozygote can be calculated by adding the probabilities of having two copies of each allele: P(AA) + P(SS) + P(CC) = (0.83 x 0.83) + (0.04 x 0.04) + (0.13 x 0.13) = 0.6889 + 0.0016 + 0.0169 = 0.7074.
The probability of an individual being AS can be calculated using the formula for the probability of independent events: P(AS) = P(A) x P(S) = 0.83 x 0.04 = 0.0332.
The probability of an individual being AS or AC can be calculated by adding the probabilities of each event: P(AS) + P(AC) = 0.0332 + (0.83 x 0.13) = 0.0332 + 0.1079 = 0.1411.
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Whelp the teacher said to solve them and something abt shading HELP
Shaded region represents the set of all points (x, y) that satisfy both inequalities y > -x-2 and y < -5x+2.
What is Inequality?a relationship between two expressions or values that are not equal to each other is called 'inequality.
First, we graph the lines y = -x-2 and y = -5x+2 using their y-intercepts and slopes.
The line y = -x-2 has a y-intercept of -2 and a slope of -1, which means that for every increase of 1 in x, y decreases by 1.
The line y = -5x+2 has a y-intercept of 2 and a slope of -5, which means that for every increase of 1 in x, y decreases by 5.
The shaded region represents the set of all points (x, y) that satisfy both inequalities y > -x-2 and y < -5x+2.
Hence, shaded region represents the set of all points (x, y) that satisfy both inequalities y > -x-2 and y < -5x+2.
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The speed of sound is approximately 1,2251, kilometers per hour. When an object travels faster than the speed of sound, it creates a sonic boom.
The speed of sound is about 343 meters per second (or approximately 1,225 kilometers per hour).
The assertion you made appears to be incorrect. At sea level, the actual speed of sound is roughly 1,225 kilometres per hour, or 767 miles per hour.
The distance that sound travels through a medium, such air, in a predetermined length of time is known as the speed of sound. It is impacted by the medium's temperature, pressure, and humidity. The speed of sound is roughly 343 metres per second in dry air at 20 degrees Celsius (or approximately 1,225 kilometres per hour).
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Find the real zeros (if any ) of the rational function. Use a gra g(x)=(x^(2)-13x+42)/(x^(2)+9) x= NONE Submit Answer
The real zeros of the rational function [tex]g(x)=(x^2-13x+42)/(x^2+9)[/tex] are x=7 and x=6, and there are no vertical asymptotes
The real zeros of a rational function are the values of x that make the numerator equal to zero. In this case, we need to
find the values of x that satisfy the equation [tex]x^2-13x+42[/tex]=0.
We can use the quadratic formula to find the real zeros:
x = (-b ± √(b^(2)-4ac))/(2a)
where a=1, b=-13, and c=42.
Plugging these values into the formula,
we get: [tex]x = (-(-13) ± √((-13)^2-4(1)(42)))/(2(1))[/tex]
Simplifying the expression, we get:
x = (13 ± √(169-168))/2
x = (13 ± √1)/2
x = (13 ± 1)/2
The two real zeros are:
x = (13 + 1)/2 = 14/2 = 7
x = (13 - 1)/2 = 12/2 = 6
Therefore, the real zeros of the rational function are x=7 and x=6.
As for the denominator, since [tex]x^2+9[/tex]=0 has no real solutions, there are no values of x that make the denominator equal to zero. Therefore, the rational function has no vertical asymptotes.
In conclusion, the real zeros of the rational function [tex]g(x)=(x^2-13x+42)/(x^2+9)[/tex] are x=7 and x=6, and there are no vertical asymptotes.
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TIME REMAINING 17:48 The graph of f(x) = x2 is translated to form g(x) = (x – 2)2 – 3. On a coordinate plane, a parabola, labeled f of x, opens up. It goes through (negative 2, 4), has a vertex at (0, 0), and goes through (2, 4). Which graph represents g(x)? On a coordinate plane, a parabola opens up. It goes through (0, 1), has a vertex at (2, negative 3), and goes through (4, 1).
The graph of g(x) is a parabola that opens up, goes through (0, 1), has a vertex at (2, -3), and goes through (4, 1).
What is parabola ?
A parabola is a U-shaped curve that is formed by graphing a quadratic function. In other words, a parabola is the set of all points in a plane that are equidistant from a fixed point (called the focus) and a fixed line (called the directrix).
The graph of g(x) can be obtained by translating the graph of f(x) = x^2 to the left by 2 units and down by 3 units.
The vertex of g(x) is obtained by subtracting 2 from the x-coordinate and subtracting 3 from the y-coordinate of the vertex of f(x). Thus, the vertex of g(x) is (2, -3).
The point (-2, 4) on f(x) is translated left by 2 units to (−4, 4) on g(x) and then down by 3 units to (−4, 1). The point (2, 4) on f(x) is translated left by 2 units to (0, 4) on g(x) and then down by 3 units to (0, 1).
Therefore, the graph of g(x) is a parabola that opens up, goes through (0, 1), has a vertex at (2, -3), and goes through (4, 1).
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Answer:
A
Step-by-step explanation:
A factory produces Product A every 6 hours and Product B every 21 hours. A worker started the production machines for both products at the same time. How many hours later will both products finish at the same time? A. 14 B. 15 C. 27 D. 42 E. 126
Both products finish at the same time, which is D) 42 hours later.
Solving use LCMThe factory produces Product A every 6 hours and Product B every 21 hours.
If they started at the same time, they will finish at the same time after the lowest common multiple of the two intervals, which is 42 hours.
Therefore, the answer is D. 42 hours.
LCM is the short form for “Least Common Multiple.” The least common multiple is defined as the smallest multiple that two or more numbers have in common.
For example: Take two integers, 2 and 3.
Multiples of 2: 2, 4, 6, 8, 10, 12, 14, 16, 18, 20….
Multiples of 3: 3, 6, 9, 12, 15, 18, 21, 24, 27, 30 ….
6, 12, and 18 are common multiples of 2 and 3. The number 6 is the smallest. Therefore, 6 is the least common multiple of 2 and 3.
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Determine the values of m and n so that the following system of linear equations have infinite number of solutions:
(2m−1)x+3y−5=0
3x+(n−1)y−2=0
The final answer of values of m and n that make the system of linear equations have infinite number of solutions are m = 11/10 and n = 11/5.
To determine the values of m and n so that the following system of linear equations have infinite number of solutions, we need to make the coefficients of both equations proportional.
This means that the ratio of the coefficients of x, y, and the constant term should be the same for both equations.
Let's start by finding the ratio of the coefficients of x and y for the first equation:
(2m-1)/3 = 3/(n-1)
Cross-multiplying gives us:
3(2m-1) = 3(n-1)
Simplifying:
6m-3 = 3n-3
6m = 3n
Dividing both sides by 3:
2m = n
Now, let's find the ratio of the coefficients of x and the constant term for the first equation:
(2m-1)/(-5) = 3/(-2)
Cross-multiplying gives us:
-10m + 5 = -6
Simplifying:
-10m = -11
Dividing both sides by -10:
m = 11/10
Substituting this value of m back into the equation 2m = n, we get:
2(11/10) = n
n = 22/10
n = 11/5
Therefore, the values of m and n that make the system of linear equations have infinite number of solutions are m = 11/10 and n = 11/5.
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A right triangle has side lengths 5, 12, and 13 as shown below. Use these lengths to find sinY, tanY, and cosY.
The value of
1 sinY = 12/13
2. cos Y = 5/13
3. tanY = 12/5
What is trigonometry?Trigonometric Ratios are defined as the values of all the trigonometric functions based on the value of the ratio of sides in a right-angled triangle. The ratios of sides of a right-angled triangle with respect to any of its acute angles are known as the trigonometric ratios of that particular angle.
sin Y = opp/hyp
cos Y = adj/hyp
tan Y = opp/adj
if opp = 12
adj = 5
hyp = 13
then,
sinY = 12/13
cos Y = 5/13
tanY = 12/5
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29. What is the truth value of (~p V q) Arif p is true, q is false, and r is true?
Answer:
Step-by-step explanation:
~P is true
q is true
~p v q is true
the hypothesis (or antecedent) is true
the conclusion (or consequent) is false
R is false and ~q is false
the conditional says if true then false
so the conditional is false
3. Consider the matrix \( A \) given by \[ A=\left[\begin{array}{rrr} -3 & -2 & 2 \\ 1 & 3 & 1 \\ 4 & 4 & -1 \end{array}\right] \] (a) Show that the inverse of \( A \) can be written as \( A^{-1}=\lef
The value of A⁻¹ is given by the following matrix:
[[1/5, -2/15, 1/10],
[-1/5, 3/15, -1/10],
[4/5, -4/15, 1/10]]
This can be calculated by solving the equation A x A⁻¹ = I, where I is the identity matrix. In this equation, we can solve for A⁻¹ by multiplying both sides of the equation by the inverse of A, which can be found by solving the system of equations A x X = I.
After solving this system of equations, the inverse of A is the matrix X. The value of A⁻¹ is then found by substituting the values of X into the matrix A⁻¹.
To find the inverse of A, first find the determinant of A, which can be calculated using the formula |A| = (-3)(3)(-1) + (-2)(1)(4) + (2)(4)(1) = -20. Since the determinant is not 0, A is invertible and the inverse can be found.
To solve for A⁻¹, first calculate the cofactor matrix C for A by taking the transpose of the matrix of minors for A, which can be found by calculating the determinants of each submatrix of A.
Then, take the determinant of A and divide each element in C by it, giving the matrix C⁻¹. Finally, multiply A and C⁻¹ to get the inverse of A, which is the matrix A⁻¹.
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Consider the matrix A given by
A = [[-3,-2,2],[1,3,1],[4,4,-1]]
Find the value of A⁻¹.
A random variable X has a normal distribution with mean 50 and variance of 10. Find the range of scores that lies
a. within two standard deviations from the mean
b. the lowest score which lies two standard deviations above the mean
c. the highest score which lies three standard
deviations below the mean.
handwritten pls, asap. will thumbs up if handwritten and correct
The range of scores that lies within two standard deviations from the mean is (43.68, 56.32), the lowest score which lies two standard deviations above the mean is 56.32, and the highest score which lies three standard deviations below the mean is 40.52.
The random variable X has a normal distribution with mean 50 and variance of 10. The standard deviation of X is the square root of the variance, which is √10 ≈ 3.16.
a. The range of scores that lies within two standard deviations from the mean is (50 - 2*3.16, 50 + 2*3.16) = (43.68, 56.32).
b. The lowest score which lies two standard deviations above the mean is 50 + 2*3.16 = 56.32.
c. The highest score which lies three standard deviations below the mean is 50 - 3*3.16 = 40.52.
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